On anti-hyperbolicity for hyperk\"ahler varieties

Abstract

By restricting to (a linear subspace of) an affine chart in projective space, a complex stably rational or unirational manifold of dimension m is meromorphically dominable by Cm, i.e., admits a meromorphic dominating map from Cm. So are varieties that are birational to abelian varieties and Kummer K3 surfaces. G. Buzzard and the second author have shown that elliptic K3 surfaces are holomorphically dominable by C2, i.e. admitting a holomorphic map with nontrivial Jacobian. In this paper we explore various examples and criteria for meromorphic and holomorphic dominability by Cm of certain hyperk\"ahler manifolds, generalizing some known results about K3 surfaces. Anti-hyperbolicity has several interpretations in the sense of vanishing of the Kobayashi-Royden metrics, admitting dense entire holomorphic curves, or dominating holomorphic or meromorphic maps from the complex affine space of the same dimension.

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